Surveys in Mathematics and its Applications
ISSN1842-6298 (electronic), 1843-7265 (print) Volume3(2008), 195 – 209
A SURVEY ON DILATIONS OF PROJECTIVE
ISOMETRIC REPRESENTATIONS
Tania-Luminit¸a Costache
Abstract. In this paper we present Laca-Raeburn’s dilation theory of projective isometric representations of a semigroup to projective isometric representations of a group [4] and Murphy’s proof of a dilation theorem more general than that proved by Laca and Raeburn. Murphy applied the theory which involves positive definite kernels and their Kolmogorov decompositions to obtain the Laca-Raeburn dilation theorem [6].
We also present Heo’s dilation theorems for projective representations, which generalize Stine-spring dilation theorem for covariant completely positive maps and generalize to HilbertC∗-modules the Naimark-Sz-Nagy characterization of positive definite functions on groups [2].
In the last part of the paper it is given the dilation theory obtained in [6] in the case of unitary operator-valued multipliers [3].
Full text
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2000 Mathematics Subject Classification: 20C25; 43A35; 43A65; 46L45; 47A20.
Keywords: multiplier; isometric projective representation; positive definite kernel; Kolmogorov decomposition; dilation.
2
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Tania-Luminit¸a Costache Faculty of Applied Sciences,
University ”Politehnica” of Bucharest, Splaiul Independent¸ei 313, Bucharest, Romania.
e-mail: lumycos@yahoo.com
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